@keyframes rwdcur217912 {
0%,6.15%,100% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAADjElEQVRYhbWXXWgUVxTHf3d23K6piXaVNCYxtNBCH3xoQSNEULEPbrBYiWiFbUtJEeyDCIVEfbQvReOjfe5DG5p+uJQ+iLagLUJ0RVDbNykkkJhKmmjcJrubaWZuH+bedXacnY+1HrjcO2fOPf//uefcM7uC/1lkIW8CWaAdWKfmMjALTANzYmDU0fZGHKelB+MyAYcMkFZzpyKgR4saNYkkUHowLts6+pKQcNRYA5hKt6Kw0n7jUAIaHCABCRPYAXwA7FQYi0AVsNQcTcALriUmiU6gQ60zwKQCbsE9lTpMkwbS1tEnNJgCrukjCJSA12l9YRDLhuWVq4pECTc1G4AZbRyaAj9YDHDEwOgMUKRswepVAMeBfmAL0ObHrHtIWO1h9gVseYd/lsFNwyu4kWeBuUACSas9wn6E9pY36VwL0APcA/4EboqB0boiNL3OoiIL0msSOj2ykIdM6ijbX4M/7gPcAorAr2JgdLGR02ceXnKykN8t7x6TspA/KQv5zUHBaBH+E9DVHhBloF7v8Rfo7OSFDms5tSslxY2Nb7w72YiAqRwJX9OpOfNGFqT3g0/f+/EjAMuiRwhxGsmrDcPHU4SKRKyrFma/WCr3VMrVL0HujeOnrhHFBQ+zX/1iZq+UEoHR+/XYTwATqFQHSeS3IOw5SMxUqneV+SSuDw/tC01Bw1bsv5qegpNhJ6Wi5v3D+wBwhNON24oDpeEJ6Bz7SEWmaf87b/+s14cO9LNiO9fC7CO/BZpE3AJtXdd2RK+XlsqM/XAx1D7yB0nS2/EUgBDxrmEUiSSgXRtfBuDqb8VI24ZFGCVDfazR65Fxaj2+Wqmya0cvtm1TrlQxRDj3pgh8upMNRgt/e1Q1lAuFi2zb+hZL5UosX7FS4BczwxkpcRzJeSm5Mpxj0Pv++s07zM0/en4EhMEgDh+PXOKYIfgEOOO3mflr9vkRUDuPANiSr7zqhdsF7MpjAOzKYxZ+/75u2/AeTg7lKA7lKEJIjw6ToT0cFoJvAEsI0tJt0JZ+LwyRdl1LpCMt33ZTCIypeejKcrApAgAn+pFT87BpffK9U/Pu3L2W/uZT4DCmnemRCDzLd2d/4VLTfSBzmXxXjtv3Hz4pwLgkurKcmGjlHDRZA14ZztGNpG/6Ed9GAq/nPeGwcPYytQ/WMxPQcmo37U6ao1MPOe1/t+klPjP+5YvPrzCH+++oJv8BjvqPrkT8Gf0AAAAASUVORK5CYII=) 9 10, auto;}
6.25%,12.4% {cursor:url(data:image/png;base64,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) 9 10, auto;}
12.5%,18.65% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAADmElEQVRYhbWXS2hUVxjHf+fmGsbXOE5CO+aFQoQusrCLpjCLGhR1UiWVFKMwUsQitAsRhCR2GTcS7bIuxUUNxtdYupDYgqUI06YbRQSDoAaT2hDzcprMTKcz97iYc5Obm7mPGeMHh/P6Hv/zPc65V7CKJBPxdUBINQAdmAImRedAvpSM5kdxaiIpfWLQgWqgFtgLdACtQMBJwBNAaiIpg5GoXxA5IA+0AJuBNcBWljyygoQf45Y5wUjUVUaF4SiwHQgqULeBx4ChAM6bIXH0gN04gB9PiM6BNDAEzAIp1UJAnQKkqx5XAMFIVKQmkqQmkiYgvx7QlZE0xXx4puxoFHNBBzSZiGuoiSMpENI6d+NX1Az0AgeU/iTwXO2NqN4QnQMG2DxQRra78Z+iJXKMndtqaYmECAU+p+iNsGo5imFhGYAys92Nv47tdRBug+YwZPMAT4CXwIjoHJix3gm6VZnHyUqumyAs4emDQgf8CyOvIZvfA7wC5oBJJ6Xv3KzgZCJ+SY72SJmI7yh1ECsJuwfMrC9xypLrpow9QSdHb0Vy/1W1VUnx55aPvhh1AqArRcIKwqrMqQrMdbvx8ac/HQPI5WgSQvQh2eZ4fCxJaNa9z1Jz5J9PpZsy6exlkPv96Fl2D/g17sa/dn1gv5QSgdZ6ZfBngBe4XPmuj5E96/2UqF5V1bpGXzrXV10driFwvAntpWlJOOnmKXVqjh7pAMAQRgMw6sTv+RbYQHmG6eCB3b+Y464v28kXjPtu/K4hsILwm6AbQ8ET5nhhIc3gzTuu/J4fJOVWxwoDQvgrQy8Q5Rit3/IhAL/9PuzJ6/ocu1F3lA3m+EKSeXOczWRp+6yVQqFAOpNFE+7YKwJweie12jpeW5YWrdxK3OHTTz5mIZ3xpctXCOykB+iXEsOQ/CAl93piHLfu//HXQ6amZ98fAKFxHIOvLwxxUhN8C/TbeV79s/LlXTUASvIEQEHyo3V57kGCQuYNAIXMG+Ye3Vgm1rOPM90xhrtjDIPHZ7kTde/jiBBcBXJCUC2LF3TO3BeaqC6qlkhD5mziuhBoY9NQH+ZQRQAAetuRY9PQWFO+7Nh0sW/YRHvlITAYNJWZrSzjYa6f/5Whiu+BwF3i9TEe/D2zlIB+QdSH6X2xke+hwhywUk+MBiTR8VmueRqu4bAwmDt/l8UH650BmPTdLj4wqvlmbIY++17jZs5q/3Px3D2mKP4fLtJbrTuad/llBQAAAAAASUVORK5CYII=) 9 10, auto;}
18.75%,24.9% {cursor:url(data:image/png;base64,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) 9 10, auto;}
25%,31.15% {cursor:url(data:image/png;base64,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) 9 10, auto;}
31.25%,37.4% {cursor:url(data:image/png;base64,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) 9 10, auto;}
37.5%,43.65% {cursor:url(data:image/png;base64,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) 9 10, auto;}
43.75%,49.9% {cursor:url(data:image/png;base64,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) 9 10, auto;}
50%,56.15% {cursor:url(data:image/png;base64,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) 9 10, auto;}
56.25%,62.4% {cursor:url(data:image/png;base64,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) 9 10, auto;}
62.5%,68.65% {cursor:url(data:image/png;base64,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) 9 10, auto;}
68.75%,74.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAADf0lEQVRYhdWXX2hTVxzHP+fmGmrVWFuZ0dbqfHJv88HI8jCLCqY43MhQKxlDHMLG2IvQqo/6Iuoe57MPGls3vYgPTjdwE6Frx1DxQUEcDbRW6Rrbhjapae49e0hOvb3m/klExB+EnPzO7/f7fs/vz7k38D5I7nm/fNfgMigJaaSQRiosjZQWxF74gUeicftvItG4q480UjrQVPmpAdNACSiJZNqqiYATPAgJaaSagPVABxABxoFRwAL+Ecn0aGACigRAJBon97yfytorAx8De4AYSxftYFUE/s1mgAvAI+CiSKYX+HjWyQnmAx4GGoECEGNDCyzRoTG8HlgJNFfDW6Cotdsd9hYwCTwEwsxZEArBnAlQBAaq9cE8AVXzoCSc9iKZLgFjQIZwqIGNa2DdCpgzc8CvwN1qcXR7MJeTeeoViUg0LkQyPS6NVJSiWWIipzMyBfA9kHGdArdur1XUdEgjBdDV++ej3v0dH31CuSxPKhl6nYA6mSKhur3KKavq7eD2vbHMlWjxZagjJMXA6o2fZ9yI65VACzJhD2ZPezW9E3zk8dUDAMUi7UKI40g+dAMHWxNWSHiOml3c7Kdz+fZCfvYcyF1B4ujOoEGcvOwXL2nYJaVEoMUu9F0DGMLjwvO8iJxdH2RE9VAotkh/da6v9+72LIHutuGcDlvDSa9MVU7NV127AbCE1QZk3OxdM6Bq7CDlW6YvPtv+m1rv/bKTkmnd8bL3fRYoEkEbdFlT5JBaz8zk6bt83dPe96Wh1ul4DUCIYGPoR6IW0NbVqwD44/agr61rE/pJd5ylan2mn2m1ni3M0vFpDNM0yRdm0YQ397oIHN7KSq2R/2yqeZQrxnW2bN7ETL4QKFagEjhFb+CUlFiW5CcpudWT4KB9/6+/7zOenXh7BITGQSy+OXODHzTBd8App83os7G3R6DieQjAlJy3qyfvGZiFKQDMwhSTD35Z4Nazk6PdCQa7EwyCz0upm3TvpEsIeoGiEIRl+YIuqn2hiXA5tERasuhw14VAG85CazN76iIAcKQTOZyFtS21+w5ny99ty+msvwQWfSqY+tQE3szPp3/nRt33QMNNUq0J7j198aoBg5JobebI0DJ+hDp7wC49CdqQxEcmuOQL3MI+YTF5+ibzD6w3JqDk2DY+sMJ8O/yC4869tSs4oc1x9uQtxin/f5iX/wFiqYh0Mw2wCgAAAABJRU5ErkJggg==) 9 10, auto;}
75%,81.15% {cursor:url(data:image/png;base64,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) 9 10, auto;}
81.25%,87.4% {cursor:url(data:image/png;base64,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) 9 10, auto;}
87.5%,93.65% {cursor:url(data:image/png;base64,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) 9 10, auto;}
93.75%,99.9% {cursor:url(data:image/png;base64,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) 9 10, auto;}
}
div.testarea{
animation:rwdcur217912 2.6666666666667s linear infinite forwards;
}